English

Warps and grids for double and triple vector bundles

Differential Geometry 2017-05-24 v2 Category Theory

Abstract

A triple vector bundle is a cube of vector bundle structures which commute in the (strict) categorical sense. A grid in a triple vector bundle is a collection of sections of each bundle structure with certain linearity properties. A grid provides two routes around each face of the triple vector bundle, and six routes from the base manifold to the total manifold, the warps measure the lack of commutativity of these routes. In this paper we first prove that the sum of the warps in a triple vector bundle is zero. The proof we give is intrinsic and, we believe, clearer than the proof using decompositions given earlier by one of us. We apply this result to the triple tangent bundle T3MT^3M of a manifold and deduce (as earlier) the Jacobi identity. We further apply the result to the triple vector bundle T2AT^2A for a vector bundle AA using a connection in AA to define a grid in T2AT^2A. In this case the curvature emerges from the warp theorem.

Keywords

Cite

@article{arxiv.1705.01017,
  title  = {Warps and grids for double and triple vector bundles},
  author = {Magdalini K. Flari and Kirill Mackenzie},
  journal= {arXiv preprint arXiv:1705.01017},
  year   = {2017}
}

Comments

45 pages. Typos and minor slips corrected. Appendix on warps and duality added. Additional commentary

R2 v1 2026-06-22T19:34:19.933Z